A classification of 3+1D bosonic topological orders (II): the case when some point-like excitations are fermions (1801.08530v2)
Abstract: In this paper, we classify EF topological orders for 3+1D bosonic systems where some emergent pointlike excitations are fermions. (1) We argue that all 3+1D bosonic topological orders have gappable boundary. (2) All the pointlike excitations in EF topological orders are described by the representations of $G_f=Z_2f\leftthreetimes_{e_2} G_b$ -- a $Z_2f$ central extension of a finite group $G_b$ characterized by $e_2\in H2(G_b,Z_2)$. (3) We find that the EF topological orders are classified by 2+1D anomalous topological orders $\mathcal{A}_b3$ on their unique canonical boundary. Here $\mathcal{A}_b3$ is a unitary fusion 2-category with simple objects labeled by $\hat G_b=Z_2m\leftthreetimes G_b$. $\mathcal{A}_b3$ also has one invertible fermionic 1-morphism for each object as well as quantum-dimension-$\sqrt 2$ 1-morphisms that connect two objects $g$ and $gm$, where $g\in \hat G_b$ and $m$ is the generator of $Z_2m$. (4) When $\hat G_b$ is the trivial $Z_2m$ extension, the EF topological orders are called EF1 topological orders, which is classified by simple data $(G_b,e_2,n_3,\nu_4)$. (5) When $\hat G_b$ is a non-trivial $Z_2m$ extension, the EF topological orders are called EF2 topological orders, where some intersections of three stringlike excitations must carry Majorana zero modes. (6) Every EF2 topological order with $G_f=Z_2f\leftthreetimes G_b$ can be associated with a EF1 topological order with $G_f=Z_2f\leftthreetimes \hat G_b$. (7) We find that all EF topological orders correspond to gauged 3+1D fermionic symmetry protected topological (SPT) orders with a finite unitary symmetry group. (8) We further propose that the general classification of 3+1D topological orders with finite unitary symmetries for bosonic and fermionic systems can be obtained by gauging or partially gauging the finite symmetry group of 3+1D SPT phases of bosonic and fermionic systems.